A certain reciprocal power sum is never an integer
Abstract
By we denote the set of all the infinite sequences of positive integers (note that all the are not necessarily distinct and not necessarily monotonic). Let be a polynomial of nonnegative integer coefficients. Let and . When is linear, Feng, Hong, Jiang and Yin proved in [A generalization of a theorem of Nagell, Acta Math. Hungari, in press] that for any infinite sequence of positive integers, is never an integer if . Now let deg. Clearly, . But it is not clear whether the reciprocal power sum can take 1 as its value. In this paper, with the help of a result of Erd\H{o}s, we use the analytic and -adic method to show that for any infinite sequence of positive integers and any positive integer , is never equal to 1. Furthermore, we use a result of Kakeya to show that if holds for all positive integers , then the union set is dense in the interval with . It is well known that when . Our dense result infers that when , for any sufficiently small , there are positive integers and and infinite sequences and of positive integers such that and .
Keywords
Cite
@article{arxiv.1812.08705,
title = {A certain reciprocal power sum is never an integer},
author = {Junyong Zhao and Shaofang Hong and Xiao Jiang},
journal= {arXiv preprint arXiv:1812.08705},
year = {2018}
}
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11 pages